On Extremal Properties of k-CNF: Capturing Threshold Functions
Abstract
We consider a basic question on the expressiveness of k-CNF formulas: How well can k-CNF formulas capture threshold functions? Specifically, what is the largest number of assignments (of Hamming weight t) accepted by a k-CNF formula that only accepts assignments of weight at least t? Among others, we provide the following results: - While an optimal solution is known for t ≤ n/k, the problem remains open for t > n/k. We formulate a (monotone) version of the problem as an extremal hypergraph problem and show that for t = n-k, the problem is exactly the Tur\'an problem. - For t = α n with constant α, we provide a construction and show its optimality for 2-CNF. Optimality of the construction for k>2 would give improved lower bounds for depth-3 circuits.
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